T. A. S. Ibrahim scite author profile

This paper aims to obtain the thermodynamic variables (temperature, thermodynamic volume, angular velocity, electrostatic potential, and heat capacity) corresponding to the Schwarzschild black hole, Reissner-Nordstrom black hole, Kerr black hole and Kerr-Newman-Anti-de Sitter black hole. We also obtained the free energy for black holes by using three different methods. We obtained the equation of state for rotating Banados, Teitelboim and Zanelli black holes. Finally, we used the quantum correction of the partition function to obtain the heat capacity and entropy in the quantum sense.

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Spherically symmetric de Sitter solution of black holes

Mourad

Hussein

Eisa

et al. 2020

Indian J Phys

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In this study we obtain the solution of the spherically symmetric de Sitter solution of black holes using a general form of distribution functions which include Gaussian, Rayleigh, and Maxwell-Boltzmann distribution as a special case. We investigate the properties of thermodynamics variables such as the Hawking temperature, the entropy, the mass and the heat capacity of black holes. Moreover, we show that the strong energy condition which includes the null energy condition is satisfied. Finally, we show the regularity of the solution by calculating the scalar curvature and invariant curvature in general distribution form.

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Design of sampled-data multivariable control systems using the inverse Nyquist array

Ibrahim

Munro

1975

International Journal of Control

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The solution of the Einstein equation in the interior of the black holes by using arbitrary distribution functions

Hussein¹,

Eisa²,

Ibrahim³

2018

Preprint

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T. A. S. Ibrahim

Thermodynamics variables of the BTZ Black Hole with a Minimal Length and its Efficiency

The Free Energy for Rotating and Charged Black Holes and Banados, Teitelboim and Zanelli Black Holes

Spherically symmetric de Sitter solution of black holes

Design of sampled-data multivariable control systems using the inverse Nyquist array

The solution of the Einstein equation in the interior of the black holes by using arbitrary distribution functions

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